论文信息 - Maximal order reduction and supremal (A,B)-invariant and controllability subspaces

Maximal order reduction and supremal (A,B)-invariant and controllability subspaces

Given the system \{A,B,C,E\} the supremal ( A,B )-invariant and controllability subspaces are studied and their dimensions are explicitly determined as functions of the number of zeros and the degree of the determinant of the interactor. This is done by solving the problem of the maximal order reduction via linear state feedback.

P. Antsaklis

[1] W. Wolovich. 0n the numerators and zeros and rational transfer matrices , 1973 .

[2] L. Silverman,et al. A time domain characterization of the invariant factors of a system transfer function , 1974 .

[3] William A. Wolovich,et al. On the cancellation of multivariable system zeros by state feedback , 1974 .

[4] Brian D. O. Anderson,et al. Output-Nulling Invariant and Controllability Subspaces , 1975 .

[5] J. P. Corfmat,et al. Control of Linear Systems through Specified Input Channels , 1976 .

[6] P. Falb,et al. Invariants and Canonical Forms under Dynamic Compensation , 1976 .

[7] T. Mita,et al. On maximal unobservable subspace, zeros and their applications , 1977 .

[8] K. Furuta,et al. State feedback and inverse system , 1977 .

[9] Panos J. Antsaklis,et al. Stable proper nth-order inverses , 1978 .